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|
(************************************************************************)
(* v * The Coq Proof Assistant / The Coq Development Team *)
(* <O___,, * CNRS-Ecole Polytechnique-INRIA Futurs-Universite Paris Sud *)
(* \VV/ **************************************************************)
(* // * This file is distributed under the terms of the *)
(* * GNU Lesser General Public License Version 2.1 *)
(************************************************************************)
(* *)
(* Micromega: A reflexive tactic using the Positivstellensatz *)
(* *)
(* Frédéric Besson (Irisa/Inria) 2006-2008 *)
(* *)
(************************************************************************)
let debug = false
let fst' (Micromega.Pair(x,y)) = x
let snd' (Micromega.Pair(x,y)) = y
let rec try_any l x =
match l with
| [] -> None
| (f,s)::l -> match f x with
| None -> try_any l x
| x -> x
let list_try_find f =
let rec try_find_f = function
| [] -> failwith "try_find"
| h::t -> try f h with Failure _ -> try_find_f t
in
try_find_f
let rec list_fold_right_elements f l =
let rec aux = function
| [] -> invalid_arg "list_fold_right_elements"
| [x] -> x
| x::l -> f x (aux l) in
aux l
let interval n m =
let rec interval_n (l,m) =
if n > m then l else interval_n (m::l,pred m)
in
interval_n ([],m)
open Num
open Big_int
let ppcm x y =
let g = gcd_big_int x y in
let x' = div_big_int x g in
let y' = div_big_int y g in
mult_big_int g (mult_big_int x' y')
let denominator = function
| Int _ | Big_int _ -> unit_big_int
| Ratio r -> Ratio.denominator_ratio r
let numerator = function
| Ratio r -> Ratio.numerator_ratio r
| Int i -> Big_int.big_int_of_int i
| Big_int i -> i
let rec ppcm_list c l =
match l with
| [] -> c
| e::l -> ppcm_list (ppcm c (denominator e)) l
let rec rec_gcd_list c l =
match l with
| [] -> c
| e::l -> rec_gcd_list (gcd_big_int c (numerator e)) l
let rec gcd_list l =
let res = rec_gcd_list zero_big_int l in
if compare_big_int res zero_big_int = 0
then unit_big_int else res
let rats_to_ints l =
let c = ppcm_list unit_big_int l in
List.map (fun x -> (div_big_int (mult_big_int (numerator x) c)
(denominator x))) l
(* Nasty reordering of lists - useful to trim certificate down *)
let mapi f l =
let rec xmapi i l =
match l with
| [] -> []
| e::l -> (f e i)::(xmapi (i+1) l) in
xmapi 0 l
let concatMapi f l = List.rev (mapi (fun e i -> (i,f e)) l)
(* assoc_pos j [a0...an] = [j,a0....an,j+n],j+n+1 *)
let assoc_pos j l = (mapi (fun e i -> e,i+j) l, j + (List.length l))
let assoc_pos_assoc l =
let rec xpos i l =
match l with
| [] -> []
| (x,l) ::rst -> let (l',j) = assoc_pos i l in
(x,l')::(xpos j rst) in
xpos 0 l
let filter_pos f l =
(* Could sort ... take care of duplicates... *)
let rec xfilter l =
match l with
| [] -> []
| (x,e)::l ->
if List.exists (fun ee -> List.mem ee f) (List.map snd e)
then (x,e)::(xfilter l)
else xfilter l in
xfilter l
let select_pos lpos l =
let rec xselect i lpos l =
match lpos with
| [] -> []
| j::rpos ->
match l with
| [] -> failwith "select_pos"
| e::l ->
if i = j
then e:: (xselect (i+1) rpos l)
else xselect (i+1) lpos l in
xselect 0 lpos l
module CoqToCaml =
struct
open Micromega
let rec nat = function
| O -> 0
| S n -> (nat n) + 1
let rec positive p =
match p with
| XH -> 1
| XI p -> 1+ 2*(positive p)
| XO p -> 2*(positive p)
let n nt =
match nt with
| N0 -> 0
| Npos p -> positive p
let rec index i = (* Swap left-right ? *)
match i with
| XH -> 1
| XI i -> 1+(2*(index i))
| XO i -> 2*(index i)
let z x =
match x with
| Z0 -> 0
| Zpos p -> (positive p)
| Zneg p -> - (positive p)
open Big_int
let rec positive_big_int p =
match p with
| XH -> unit_big_int
| XI p -> add_int_big_int 1 (mult_int_big_int 2 (positive_big_int p))
| XO p -> (mult_int_big_int 2 (positive_big_int p))
let z_big_int x =
match x with
| Z0 -> zero_big_int
| Zpos p -> (positive_big_int p)
| Zneg p -> minus_big_int (positive_big_int p)
let num x = Num.Big_int (z_big_int x)
let rec list elt l =
match l with
| Nil -> []
| Cons(e,l) -> (elt e)::(list elt l)
let q_to_num {qnum = x ; qden = y} =
Big_int (z_big_int x) // (Big_int (z_big_int (Zpos y)))
end
module CamlToCoq =
struct
open Micromega
let rec nat = function
| 0 -> O
| n -> S (nat (n-1))
let rec positive n =
if n=1 then XH
else if n land 1 = 1 then XI (positive (n lsr 1))
else XO (positive (n lsr 1))
let n nt =
if nt < 0
then assert false
else if nt = 0 then N0
else Npos (positive nt)
let rec index n =
if n=1 then XH
else if n land 1 = 1 then XI (index (n lsr 1))
else XO (index (n lsr 1))
let idx n =
(*a.k.a path_of_int *)
(* returns the list of digits of n in reverse order with
initial 1 removed *)
let rec digits_of_int n =
if n=1 then []
else (n mod 2 = 1)::(digits_of_int (n lsr 1))
in
List.fold_right
(fun b c -> (if b then XI c else XO c))
(List.rev (digits_of_int n))
(XH)
let z x =
match compare x 0 with
| 0 -> Z0
| 1 -> Zpos (positive x)
| _ -> (* this should be -1 *)
Zneg (positive (-x))
open Big_int
let positive_big_int n =
let two = big_int_of_int 2 in
let rec _pos n =
if eq_big_int n unit_big_int then XH
else
let (q,m) = quomod_big_int n two in
if eq_big_int unit_big_int m
then XI (_pos q)
else XO (_pos q) in
_pos n
let bigint x =
match sign_big_int x with
| 0 -> Z0
| 1 -> Zpos (positive_big_int x)
| _ -> Zneg (positive_big_int (minus_big_int x))
let q n =
{Micromega.qnum = bigint (numerator n) ;
Micromega.qden = positive_big_int (denominator n)}
let list elt l = List.fold_right (fun x l -> Cons(elt x, l)) l Nil
end
module Cmp =
struct
let rec compare_lexical l =
match l with
| [] -> 0 (* Equal *)
| f::l ->
let cmp = f () in
if cmp = 0 then compare_lexical l else cmp
let rec compare_list cmp l1 l2 =
match l1 , l2 with
| [] , [] -> 0
| [] , _ -> -1
| _ , [] -> 1
| e1::l1 , e2::l2 ->
let c = cmp e1 e2 in
if c = 0 then compare_list cmp l1 l2 else c
let hash_list hash l =
let rec _hash_list l h =
match l with
| [] -> h lxor (Hashtbl.hash [])
| e::l -> _hash_list l ((hash e) lxor h) in
_hash_list l 0
end
|
